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Lecture 3 Linear random intercept models

Lecture 3 Linear random intercept models. Example: Weight of Guinea Pigs Body weights of 48 pigs in 9 successive weeks of follow-up (Table 3.1 DLZ)

Michelle
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Lecture 3 Linear random intercept models

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  1. Lecture 3Linear random intercept models

  2. Example: Weight of Guinea Pigs Body weights of 48 pigs in 9 successive weeks of follow-up (Table 3.1 DLZ) The response is measures at n different times, or under n different conditions. In the guinea pigs example the time of measurement is referred to as a "within-units" factor. For the pigs n=9 Although the pigs example considers a single treatment factor, it is straightforward to extend the situation to one where the groups are formed as the results of a factorial design (for example, if the pigs were separated into males and female and then allocated to the diet groups)

  3. Pig Data 48 Pigs Weight (kg) Week

  4. Pigs data model 1 – OLS fit . regress weight time Source | SS df MS Number of obs = 432 -------------+------------------------------ F( 1, 430) = 5757.41 Model | 111060.882 1 111060.882 Prob > F = 0.0000 Residual | 8294.72677 430 19.2900622 R-squared = 0.9305 -------------+------------------------------ Adj R-squared = 0.9303 Total | 119355.609 431 276.927167 Root MSE = 4.392 ------------------------------------------------------------------------------ weight | Coef. Std. Err. t P>|t| [95% Conf. Interval] -------------+---------------------------------------------------------------- time | 6.209896 .0818409 75.88 0.000 6.049038 6.370754 _cons | 19.35561 .4605447 42.03 0.000 18.45041 20.26081 ------------------------------------------------------------------------------ OLS results

  5. Example: Weight of Pigs For this type of repeated measures study we recognize two sources of random variation Between: There is heterogeneity between pigs, due for example to natural biological (genetic?) variation Within: There is random variation in the measurement process for a particular unit at any given time. For example, on any given day a particular guinea pig may yield different weight measurements due to differences in scale (equipment) and/or small fluctuations in weight during a day

  6. A) Linear model with random intercept Variance between Variance within Intraclass correlation coefficient! Why?

  7. Intraclass correlation coefficient, i.e. correlation within measurements from pig i

  8. Pigs – RE model xtreg weight time, re i(Id) mle Random-effects ML regression Number of obs = 432 Group variable (i): Id Number of groups = 48 Random effects u_i ~ Gaussian Obs per group: min = 9 avg = 9.0 max = 9 LR chi2(1) = 1624.57 Log likelihood = -1014.9268 Prob > chi2 = 0.0000 ------------------------------------------------------------------------------ weight | Coef. Std. Err. z P>|z| [95% Conf. Interval] -------------+---------------------------------------------------------------- time | 6.209896 .0390124 159.18 0.000 6.133433 6.286359 _cons | 19.35561 .5974055 32.40 0.000 18.18472 20.52651 -------------+---------------------------------------------------------------- /sigma_u | 3.84935 .4058114 3.130767 4.732863 /sigma_e | 2.093625 .0755471 1.95067 2.247056 rho | .771714 .0393959 .6876303 .8413114 ------------------------------------------------------------------------------ Linear model with a random intercept - “conditional model”

  9. Interpretation of results: • Time effect: Among pigs with similar genetic variation (random effect), weight increases by 6.2 kg per week (95% CI: 6.1 to 6.3) • Estimate of heterogeneity across pigs: sigma_u^2 = 3.8^2 = 14.4 • Estimate of variation in weights within a pig over time: sigma_e^2 = 2.1^2 = 4.4 • Fraction of total variability attributable to heterogeneity across pigs: 0.77 • This is also a measure of intraclass correlation, within pig correlation….

  10. Random Effects Model E[ Yi | Ui] = β0+ β1time+ Ui E[ Yi ] =β0+ β1time

  11. Model for the mean B) Marginal Model With a Uniform or Exchangeable correlation structure Model for the covariance matrix

  12. Pigs – Marginal model xtreg weight time, pa i(Id) corr(exch) Iteration 1: tolerance = 5.585e-15 GEE population-averaged model Number of obs = 432 Group variable: Id Number of groups = 48 Link: identity Obs per group: min = 9 Family: Gaussian avg = 9.0 Correlation: exchangeable max = 9 Wald chi2(1) = 25337.48 Scale parameter: 19.20076 Prob > chi2 = 0.0000 ------------------------------------------------------------------------------ weight | Coef. Std. Err. z P>|z| [95% Conf. Interval] -------------+---------------------------------------------------------------- time | 6.209896 .0390124 159.18 0.000 6.133433 6.286359 _cons | 19.35561 .5974055 32.40 0.000 18.18472 20.52651 ------------------------------------------------------------------------------ “Population Average”, Marginal Model with Exchangeable Correlation structure results

  13. Pigs data model 1 – GEE fit . xtgee weight time, i(Id) corr(exch) . xtcorr Estimated within-Id correlation matrix R: c1 c2 c3 c4 c5 c6 c7 c8 c9 r1 1.0000 r2 0.7717 1.0000 r3 0.7717 0.7717 1.0000 r4 0.7717 0.7717 0.7717 1.0000 r5 0.7717 0.7717 0.7717 0.7717 1.0000 r6 0.7717 0.7717 0.7717 0.7717 0.7717 1.0000 r7 0.7717 0.7717 0.7717 0.7717 0.7717 0.7717 1.0000 r8 0.7717 0.7717 0.7717 0.7717 0.7717 0.7717 0.7717 1.0000 r9 0.7717 0.7717 0.7717 0.7717 0.7717 0.7717 0.7717 0.7717 1.0000 GEE fit – Marginal Model with Exchangeable Correlation structure results

  14. Marginal Model E[ Yi ] =β0+ β1time

  15. Models A and B are equivalent

  16. One group polynomial growth curve model Similarly, if you want to fit a quadratic curve E[Yij | Ui ] = Ui + b0 + b1 tj + b2 tj2

  17. Pigs – Marg. model, quadratic trend . xtgee weight time timesq, i(Id) corr(exch) GEE population-averaged model Number of obs = 432 Group variable: Id Number of groups = 48 Link: identity Obs per group: min = 9 Family: Gaussian avg = 9.0 Correlation: exchangeable max = 9 Wald chi2(2) = 25387.68 Scale parameter: 19.19317 Prob > chi2 = 0.0000 ------------------------------------------------------------------------------ weight | Coef. Std. Err. z P>|z| [95% Conf. Interval] -------------+---------------------------------------------------------------- time | 6.358818 .1763801 36.05 0.000 6.013119 6.704517 timesq | -.0148922 .017202 -0.87 0.387 -.0486076 .0188231 _cons | 19.08259 .6754833 28.25 0.000 17.75867 20.40651 ------------------------------------------------------------------------------ Exchangeable Correlation structure results

  18. Pigs data model 1 – GEE fit . xtcorr Estimated within-Id correlation matrix R: c1 c2 c3 c4 c5 c6 c7 c8 c9 r1 1.0000 r2 0.7721 1.0000 r3 0.7721 0.7721 1.0000 r4 0.7721 0.7721 0.7721 1.0000 r5 0.7721 0.7721 0.7721 0.7721 1.0000 r6 0.7721 0.7721 0.7721 0.7721 0.7721 1.0000 r7 0.7721 0.7721 0.7721 0.7721 0.7721 0.7721 1.0000 r8 0.7721 0.7721 0.7721 0.7721 0.7721 0.7721 0.7721 1.0000 r9 0.7721 0.7721 0.7721 0.7721 0.7721 0.7721 0.7721 0.7721 1.0000 GEE fit – Marginal Model with Exchangeable Correlation structure results

  19. Pigs – RE model, quadratic trend . gen timesq = time*time . xtreg weight time timesq, re i(Id) mle Random-effects ML regression Number of obs = 432 Group variable (i): Id Number of groups = 48 Random effects u_i ~ Gaussian Obs per group: min = 9 avg = 9.0 max = 9 LR chi2(2) = 1625.32 Log likelihood = -1014.5524 Prob > chi2 = 0.0000 ------------------------------------------------------------------------------ weight | Coef. Std. Err. z P>|z| [95% Conf. Interval] -------------+---------------------------------------------------------------- time | 6.358818 .1763799 36.05 0.000 6.01312 6.704516 timesq | -.0148922 .017202 -0.87 0.387 -.0486075 .0188231 _cons | 19.08259 .675483 28.25 0.000 17.75867 20.40651 -------------+---------------------------------------------------------------- /sigma_u | 3.849473 .4057983 3.130909 4.732951 /sigma_e | 2.091585 .0754733 1.948769 2.244866 rho | .7720686 .0393503 .6880712 .8415775 ------------------------------------------------------------------------------ Exchangeable Correlation structure results

  20. Random Effects Model E[ Yi | Ui] = β0+ β1time+ β2time2+ Ui E[ Yi ] = ?

  21. Pigs – Marginal model: AR(1) xtgee weight time, i(Id) corr(AR1) t(time) GEE population-averaged model Number of obs = 432 Group and time vars: Id time Number of groups = 48 Link: identity Obs per group: min = 9 Family: Gaussian avg = 9.0 Correlation: AR(1) max = 9 Wald chi2(1) = 6254.91 Scale parameter: 19.26754 Prob > chi2 = 0.0000 ------------------------------------------------------------------------------ weight | Coef. Std. Err. z P>|z| [95% Conf. Interval] -------------+---------------------------------------------------------------- time | 6.272089 .0793052 79.09 0.000 6.116654 6.427524 _cons | 18.84218 .6745715 27.93 0.000 17.52004 20.16431 ------------------------------------------------------------------------------ GEE-fit Marginal Model with AR1 Correlation structure

  22. Pigs – RE model: AR(1) xtregar weight time RE GLS regression with AR(1) disturbances Number of obs = 432 Group variable (i): Id Number of groups = 48 R-sq: within = 0.9851 Obs per group: min = 9 between = 0.0000 avg = 9.0 overall = 0.9305 max = 9 Wald chi2(2) = 12688.55 corr(u_i, Xb) = 0 (assumed) Prob > chi2 = 0.0000 ------------------------------------------------------------------------------ weight | Coef. Std. Err. z P>|z| [95% Conf. Interval] -------------+---------------------------------------------------------------- time | 6.257651 .0555527 112.64 0.000 6.14877 6.366533 _cons | 19.00945 .6281622 30.26 0.000 17.77827 20.24062 -------------+---------------------------------------------------------------- rho_ar | .73091237 (estimated autocorrelation coefficient) sigma_u | 3.583343 sigma_e | 1.5590851 rho_fov | .84082696 (fraction of variance due to u_i) theta | .60838037 ------------------------------------------------------------------------------ Random effects model with AR1 Correlation structure

  23. Important Points Modeling the correlation in longitudinal data is important to be able to obtain correct inferences on regression coefficients b There are correspondences between random effect and marginal models in the linear case because the interpretation of the regression coefficients is the same as that in standard linear regression

  24. Example using Stata:

  25. Random intercept model • U_1j ~ Normal(0, tau2) • e_ij ~ Normal(0,sigma2) • What do these random effects mean?

  26. What is the estimate of the within child correlation? 0.92^2 / (0.73^2 + 0.92^2) = 0.613 Interpretation of the age coefficients are hard.

  27. Here we have two random effects: • Random intercept: U_1j • Random slope: U_2j • We assume these two effects follow a multi-variate normal distribution with variances tau12 and tau22 and covariance tau12 • e_ij ~ Normal(0, sigma2)

  28. Significant gender effect!

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